Standard cells having transistors annotated for gate-length biasing

ABSTRACT

A standard cell library is disclosed. The standard cell library contains cells wherein at least one transistor in at least one cell is annotated for gate length biasing. Gate length biasing includes the modification of the gate length, so as to change the speed or power consumption of the modified gate length. The standard cell library is one used in the manufacturing of semiconductor devices (e.g., that result as semiconductor chips), by way of fabricating features defined on one or more layouts of geometric shapes. The annotations serve to identify which ones of the transistor gate features are to be modified before using the geometric shapes for manufacturing the semiconductor device.

CLAIM OF PRIORITY

This application is a continuation and claims priority under 35U.S.C.§120, from pending U.S. patent application Ser. No. 12/717,887,filed on Mar. 4, 2010, which claims priority from 12/212,353, filed onSep. 17, 2008, which claims priority from U.S. patent application Ser.No. 11/145,025, filed on Jun. 3, 2005, now U.S. Pat. No. 7,441,211,which claimed priority from U.S. Provisional Patent Application No.60/678,694, filed on May 6, 2005. Each of the above-identifiedapplications are incorporated herein by reference.

BACKGROUND

1. Field of the Invention

This invention relates generally to optimization of digital integratedcircuits, and more particularly, to small gate-length biasing oftransistors to improve performance characteristics.

2. Description of the Related Art

Modem-day digital integrated circuits are complex devices that oftenmust meet high performance standards. Due to their complexity, thedesign and simulation of integrated circuits is also a complex task.Furthermore, the modem-day manufacture of integrated circuits has nowreached minimum feature sizes that are down into the nanometer scale.Each new technology generation brings ever-tighter requirements formanufacturing process control. As a result, there is a demand forapproaches that can improve the performance characteristics ofintegrated circuits, preferably with minimal disruption to existingdesign and manufacturing process.

For example, power consumption is one aspect of circuit performance.High power dissipation in integrated circuits shortens battery life,reduces circuit performance and reliability, and has a large impact onpackaging costs. Power in complementary metal oxide semiconductor (CMOS)circuits consists of a dynamic component and a static component, whichis primarily due to leakage currents. While lowered supply voltages (andconsequently lowered threshold-voltages) and aggressive clock gating canachieve dynamic power reduction, these techniques typically increaseleakage power and therefore cause its share of total power to increase.Manufacturers face the additional challenge of leakage variability:recent data indicates that leakage of microprocessor chips from a single180 nm wafer can vary by as much as 20×. Thus, leakage power has becomean important design concern for the system-level chip designer since itis becoming an ever-increasing component of total dissipated power, withits contribution projected to increase from 18% at 130 nm to 54% at the65 nm node.

Leakage current is generally composed of three major components: (1)subthreshold leakage, (2) gate leakage, and (3) reverse-biaseddrain-substrate and source-substrate junction band-to-band tunnelingleakage. The reverse-biased diode junction leakage does not depend ongate-length (also called channel length), gate leakage is linearlyproportional to gate-length, and subthreshold leakage has an exponentialdependence on gate-length. Subthreshold leakage, which is alsoproportional to operating temperature, is usually the dominantcontributor to total leakage at 130 nm and is likely to remain so in thefuture. This is especially true since gate leakage, which has only asmall dependence on temperature, is often much reduced compared tosubthreshold leakage in technologies using thick gate insulatorthicknesses or high dielectric constant insulators, which is likely thecase for technology nodes less than 65 nm.

Another leakage source is gate induced drain leakage (GIDL), which isprimarily due to minority carriers in drain depletion region. GIDL isimportant primarily for moderately doped drains, since lightly dopeddrain (LDD) regions do not have high enough electric fields to triggerGIDL. LDD regions should not narrow due to channel length increases.Additionally, GIDL is a strong function of channel width and oxidethickness but not channel length. GIDL largely depends on the gate-drainoverlap region, which does not change with changes in channel length.

Proposed techniques for leakage power reduction generally include theuse of multiple supply (V_(dd) and V_(ss)) and gate threshold (V_(th))voltages, and the assignment of input values to inactive gates such thatleakage is minimized. Such leakage reduction methodologies can bedivided into two classes depending on whether they reduce standbyleakage or runtime leakage. Standby techniques reduce leakage of devicesthat are known not to be in operation, while runtime techniques reduceleakage of active devices.

Several techniques have been proposed for standby leakage reduction.Body biasing or VTMOS-based approaches dynamically adjust the deviceV_(th) by biasing the body terminal. This technique has also been usedto reduce leakage of active devices. Multi-threshold CMOS (MTCMOS)techniques use high-V_(th) CMOS (or NMOS or PMOS) devices to disconnectone or both of V_(dd) or V_(ss) from logic circuits implemented usinglow V_(th) devices in standby mode. In source biasing, a positive biasis applied in standby state to source terminals of off devices. Othertechniques include the use of transistor stacks and the use ofinput-vector control. Among the drawbacks of these techniques areincreased logic design complexity, circuit layout area overhead, and thecoarse-grained nature of the resulting power reductions.

Currently, to the inventors' knowledge, the primary mainstream approachto runtime leakage reduction is the multi-V_(th) manufacturing process.One drawback to this technique is the rise in process costs due toadditional steps and masks. However, the increased costs have beenoutweighed by the resulting leakage reductions and multi-V_(th)processes are common. One complication facing the multi-V_(th) approachis the increased variability of V_(th) for low-V_(th) devices. Thisoccurs in part due to random doping fluctuations, as well as worseneddrain induced barrier lowering (DIBL) and short-channel effects (SCE) indevices with lower channel doping. The larger variability in V_(th)degrades the achievable leakage reductions of multi-V_(th) approachesand worsens with continued MOS scaling. Moreover, multi-V_(th)methodologies do not offer a smooth tradeoff between performance andleakage power. Devices with different V_(th) typically have a largeseparation in terms of performance and leakage, for instance a 15% speedpenalty with a 10× reduction in leakage for high-V_(th) devices.

Gate-length (L_(Gate)) also affects device leakage currents. Largechanges to gate-lengths, however, even in devices within non-criticalgates, result in heavy delay and dynamic power penalties. Large changeswould also necessitate large changes in design methodology, for example,potentially significant changes in design rules. In addition, celllayouts with large changes to gate-lengths are not layout-swappable withtheir nominal versions, resulting in substantial engineering changeorder (ECO) overheads during layout. Moreover, traditional sizers, whichfocus on width-sizing or multi-V_(th) processes for optimization,perform poorly with gate-length sizing because it is fundamentallydifferent than width sizing.

Thus, there is a need to improve digital circuits, for example, byreducing leakage current and thus leakage power, while minimallyimpacting delay performance and/or design and manufacturing processes.

SUMMARY OF THE INVENTION

The present invention overcomes the limitations of the prior art byproviding small biasing of device gate-lengths, preferably in a mannerthat has low impact on existing design and/or manufacturing processes.For example, biasing of device gate-lengths affords an additional designspace to reduce chip leakage power and its variability. Typically,leakage power decreases exponentially, and delay increases linearly,with increasing gate-length. Thus, it is possible to increasegate-length only marginally to take advantage of the exponential leakagereduction, while impairing time delay performance only linearly. From adesign flow standpoint, the use of only slight increases in gate-lengthcan preserve pin- and layout-compatibility. Therefore, the technique canbe applied, for example, as a post-layout enhancement step. Applicationof gate-length biasing, primarily to those devices that do not appear incritical paths, can achieve zero or negligible degradation in delaycharacteristics for the chip.

In an exemplary embodiment, the gate-length biasing methodology includesoptimizing a circuit by adjusting a nominal gate-length of a transistorby a small bias length. The small bias length may be, for example, lessthan 10% of the nominal gate-length or less than a predefined fractionof the nominal gate-length. The bias length may be determined byevaluating a design tradeoff, such as leakage power versus circuitdelay. The gate-length biasing methodology may be applied, for example,at a cell level or a transistor level. The transistor may be part of acell that is in a non-critical timing path, or part of a cell that hasasymmetrical timing arcs. The nominal cell to replace may be identified,for example, using a sensitivity-based downsizing approach, or asensitivity-based upsizing approach, or a combination thereof.

Small gate-length biasing can also be used for various other purposes.For example, it may be used to reduce various types of power consumption(e.g., total power, static power or dynamic power), preferably in amanner that has minimal or zero impact on timing delays. Decreasinggate-lengths of certain devices can reduce time delays or increase theoperating frequency of the chip. Gate-length biasing may also be used toincrease the on-chip signal integrity. As a final example, gate-lengthbiasing may be used for manufacturability purposes: for example, toincrease the reliability or manufacturability of the chip. The amountand sign of the biasing and the specific transistors to be biased willdepend in part on the purpose of the biasing. Biasing can be positive(to longer gate-lengths) or negative (to shorter gate-lengths),depending on the application.

In an exemplary embodiment, the gate-length biasing methodology may beimplemented, for example, by generating an enhanced library including abiased variant(s) of a nominal cell, where a biased transistor in thebiased variant corresponds to a nominal transistor in the nominal cell.The biased transistor includes a biased gate-length where the biaslength is small compared to a nominal gate-length of the nominaltransistor. In an exemplary embodiment, the biased variant remainspin-compatible with the nominal cell.

In another exemplary embodiment, the gate-length biasing methodology maybe implemented using optical proximity correction to apply the smallbias length to particular transistors in a nominal layout. Theimplementation may include one or more of, for example, shifting arequired error tolerance, applying a starting edge offset, using amaximum error tolerance, accounting for iso-dense layout effects, orother techniques.

In another exemplary embodiment, the gate-length biasing methodology maybe implemented using an electronic design automation (EDA) tool, forexample, a design rule checker, to generate a biased layout includingthe small bias length applied to one or more transistors.

Other aspects of the invention include devices and systems correspondingto the methods and embodiments described above, and digital circuitsproduced by these methods.

BRIEF DESCRIPTION OF THE DRAWINGS

The invention has other advantages and features which will be morereadily apparent from the following detailed description of theinvention and the appended claims, when taken in conjunction with theaccompanying drawings, in which:

FIG. 1 is a graph of the variation of delay and leakage with gate-lengthfor an industrial 130 nm process.

FIGS. 2A and 2B are a conceptual representation of a gate-length biasingmethodology in accordance with the present invention.

FIG. 3 is a flow chart of an exemplary embodiment of an L_(Gate) biasingmethodology in accordance with the present invention.

FIG. 4A is a flow chart of an exemplary CLLB embodiment of the librarygeneration step of the method of FIG. 3.

FIG. 4B is a flow chart of an exemplary CLLB embodiment of the designoptimization step of the CLLB method of FIG. 3.

FIG. 5 is the pseudocode for an exemplary embodiment of a leakageoptimization implementation.

FIG. 6 is a flow chart of an exemplary TLLB embodiment of the librarygeneration step of the method of FIG. 3.

FIG. 7 is a flow chart of an exemplary embodiment of a biasing method todesign biased variants for the library generation method of FIG. 6.

FIG. 8 is a schematic diagram of a simple NAND cell biased using theTLLB method.

FIG. 9 is an image of a cell layout of the generic AND2X6 cell withsimulated printed gate-lengths for all devices in the cell.

FIG. 10 is a graph of the leakage distributions for the unbiased,technology-level selectively biased, and uniformly biased scenarios fora representative test case.

FIG. 11 is a flowchart of an exemplary embodiment of an OPCimplementation of the gate-length biasing methodology of the presentinvention.

FIG. 12 is a flowchart of an exemplary embodiment of a cell libraryimplementation of the gate-length biasing methodology of the presentinvention.

FIG. 13 is a flowchart of an exemplary embodiment of an EDA toolimplementation of the gate-length biasing methodology of the presentinvention.

FIG. 14 is a flowchart of an exemplary embodiment of a bias requirementcommunication methodology of the present invention.

DETAILED DESCRIPTION OF THE PREFERRED EMBODIMENTS

Gate-Length Biasing Methodology

Novel approaches using small gate-length (L_(Gate)) biasing, usually(but not always) increases in L_(Gate), for device and circuitoptimization, and preferably having minimal impact on circuitperformance and manufacturing costs, are described. The terms“gate-length biasing” and “L_(Gate) biasing” are used interchangeably torefer to the proposed technique. The phrase “biasing a device” impliesadjusting the gate-length of the device slightly. The term “nominalgate-length” refers to the gate-length of an unbiased device. Themethodology may be used, for example, to optimize (e.g., reduce) runtimeleakage power. The following examples are based on the goal of reducingleakage power (and, as a result, the gate-length biasing usually resultsin an increase in gate-lengths), but it should be recognized thatgate-length biasing is not limited to this particular application or toincreases in gate-length.

One advantage of this technique is that small increases in gate-lengthcan have significant effects on device characteristics such as leakagecurrent reduction since they take significant advantage of the SCE andincur only small penalties in drive current and input capacitance.Typically, leakage power decreases exponentially, and delay increaseslinearly, with increasing gate-length. For example, FIG. 1 is a graph ofthe variation of delay and leakage with gate-length for an industrial130 nm process. FIG. 1 shows the advantage to be gained, in particular,leakage reduction for minimal delay penalty, by slight increases ingate-length. Leakage current flattens out with gate-length beyond 140nm, making L_(Gate) biasing less desirable in that range.

FIGS. 2A and 2B are a conceptual representation of a gate-length biasingmethodology in accordance with the present invention. FIG. 2A is aconceptual representation of an unbiased circuit 210. Unbiased circuit210 includes transistors A, B, C, and D, where transistor D has width Wand length L. FIG. 2B is a conceptual representation of a biased circuit210′, which is circuit 210 of FIG. 2A after application of thegate-length biasing method of the present invention. Biased circuit 210′includes unbiased transistors A, B, and C of circuit 210. However,transistor D of unbiased circuit 210 has been replaced by transistor D′in biased circuit 210′. Transistor D′ has width W and length L+ΔL.

The gate-length biasing technique of the present invention may beapplied, for example, at the cell level or at the transistor level. Atthe cell level, in an exemplary embodiment, the approach enhances astandard cell library by adding L_(Gate) biased variants to the library.For example, as shown in FIG. 2A, transistor D is part of cell Q in theunbiased circuit 210. In biased circuit 210′ of FIG. 2B, however, cell Qhas been replaced by cell Q′, which is a biased variant of cell Q andincludes transistor D′. In an exemplary embodiment, the gate-lengthbiasing methodology is applied primarily to devices in non-criticaltiming paths, to optimize device characteristics. A critical timing path215, which does not include transistors D or D′, is shown in FIGS. 2Aand 2B. For example, in the context of leakage reduction, a leakageoptimization approach is used to incorporate slower, low-leakage cellsinto non-critical paths, while retaining faster, high-leakage cells incritical paths.

On the other hand, at the transistor level, since different transistorscontrol different timing arcs of a cell, an exemplary embodiment ofgate-length biasing at the transistor level includes individuallymodifying delays of different timing arcs. Asymmetry in timingcriticality of different timing arcs of a cell instance in a circuit,and that of rise and fall transitions, can be used by transistor levelgate-length biasing to yield significant leakage savings. For example,any of the transistors in FIG. 2A or 2B might be replaced with acorresponding biased variant as a result of applying the gate-lengthbiasing methodology at the transistor level. Alternatively, differentbiased variants of cell Q may be generated based on different timingarcs, and then cell Q is replaced by the appropriate biased version Q′in circuit 210′.

The gate-length biasing methodology can provide several advantages andbenefits. One potential benefit of the gate-length biasing methodologyis that if a gate-length bias is less than the pitch of the layout grid,the biased design generally avoids design rule violations. This allowsoptimization without costly redesign. Moreover, it implies that thebiased and unbiased cell layouts are pin-compatible and hencelayout-swappable. This allows gate-length biasing-based optimization tobe possible at any point in a design flow, unlike sizing-based methods.

Other potential benefits of the gate-length biasing methodology, in thecontext of leakage power optimization, are significant leakage reductionand minimal or zero delay penalty. Test cases showed that with a biasingof 8 nm in a 130 nm process, leakage reductions of 24% to 38% wereachieved for a set of the most commonly used cells with a delay penaltyof under 10%. Using simple sizing techniques, other test cases showed33% leakage savings with less than 3% dynamic power overhead and nodelay penalty. These phenomena are not restricted, however, to the 130nm node, and similar benefits are likely for other process nodes aswell.

Another potential benefit of the gate-length biasing methodology is achoice of biasing strategies. Exemplary embodiments of the gate-lengthbiasing methodology include a cell-level biasing methodology and atransistor-level methodology. Further optimization may be obtained byusing transistor-level gate-length biasing in conjunction withcell-level gate-length biasing. In a comparison of gate-length biasingat the cell-level and at the transistor-level in the context of leakagereduction, test cases showed transistor-level gate-length biasing canfurther reduce leakage by up to 10% but requires a potentiallysignificantly larger library. As a result of this tradeoff, in oneapproach, transistor-level biasing is done for only the most frequentlyused cells such as inverters, buffers, NAND, and NOR gates. Fortunately,the most frequently used cells have one or two inputs and hence only asmall number of variants need be characterized for them. To furtherreduce library size, only one of the cell variants in which differentlogically equivalent inputs are fast may be retained, and pin-swappingtechniques can be used during leakage optimization.

Another potential benefit of e gate-length biasing methodology is thatthe devices with biased gate-length may be more manufacturable and mayhave a larger process margin than the nominal devices. Biasing typicallydoes not require extra process steps, unlike multiple-threshold basedleakage optimization methods.

Another potential benefit is that gate-length biasing can lead to moreprocess-insensitive designs, for example, leakage variability reduction.Since the sensitivity of leakage to gate-length reduces with increasedgate-length, a fixed level of variability in gate-length translates toreduced variability in leakage. Leakage variability may occur, forexample, due to dopant variation, voltage supply variation, andtemperature variation. Dopant variation results in threshold variation,which can cause not only leakage variation, but also timing changes.Dopant fluctuation is inversely proportional to the square root of thegate area. Increasing the gate-length slightly results in a slightlyincreased gate area and thus reduced threshold and leakage variation.Additionally, multi-gate-length designs, e.g., a design includingnominal and biased gate-lengths, track supply voltage variation betterthan multi-threshold voltage designs, also leading to reduced leakagevariation. In particular, test cases showed that gate-length biaseddesigns can have 41% less leakage worst-case variability in presence ofinter-die variations as compared to nominal gate-length designs. Inpresence of both inter- and intra-die critical dimension variations,this implies selective gate-length biasing may yield designs lesssensitive to variations.

Other potential benefits of the gate-length biasing methodology includeease of use and potential for further optimization by using themethodology in conjunction with other techniques for further benefit.The use of more than two gate-lengths, for example, for the mostcommonly used cells, along with improved sizing techniques, or othercommon optimization techniques, is likely to yield further optimization,such as better leakage savings. In particular, in the context of leakagereduction, further reductions in leakage are possible by applyinggate-length biasing after first applying the multi-threshold voltagetechnique, which is widely used for leakage reduction.

As an example of the benefits available from applying the gate-lengthbiasing methodology to a process with multi-V_(th), an advanced lowpower process may yield products that have an off current (I_(off)) forhigh-V_(th) devices of less than 20 pA/μm, with a portion of I_(off) dueto junction leakage that is not affected by gate-length biasing, andthree orders of magnitude delta between active and standby currents. AnI_(off) of 20 pA/μm indicates that the leakage power budget is quitesmall and that leakage is always a concern. Also, the three orders ofmagnitude difference is quite large, indicating room for furtheroptimization. Thus, even though the design process starts with amulti-V_(th) library first, gate-length biasing can still play asignificant role in the low power design flow.

The gate-length biasing methodology could exploit the design spacesoffered by considering the overall distribution of power consumption(e.g., including transponder power) and sensitivities to both standbyand total power by, for example, constraining the biasing so as to notincrease total power, etc. In particular, the gate-length biasingmethodology may apply an optical proximity correction (OPC) guidance“knob” (discussed in more detail infra), not available in standardmulti-V_(th) processes, to achieve improved robustness and siliconquality. Also, the gate-length biasing methodology provides a“granularity” win. In particular, conventional critical dimension (CD)biases on nominal or low-V_(th) devices are inserted to gain speed butthey also push leakage up substantially beyond the 20 pA/μm value.Instead of discretely jumping from 20 pA/μm to nA leakage levels withthe corresponding 30% speed boost, a conventional low power processcould include a larger L_(Gate) and nominal- or low-V_(th) combinationto create a finer tradeoff of speed versus leakage. Lastly, no matterhow small the high-V_(th) device leakage is, the gate-length biasingmethodology typically provides further reduction in leakage. Gate-lengthbiasing of high-V_(th) devices can be valuable because there are oftenmany high-V_(th) devices because the sizer begins with high-V_(th), anda large percentage of high-V_(th) devices can be biased because of largeslack on many paths even after V_(th) assignment. For these reasons,significant leakage savings are possible. This highlights the value ofthe gate-length biasing technique, since further reductions in leakageare realizable using both optimization methods in conjunction with eachother.

The gate-length biasing methodology may also yield further benefit to aprocess that already includes multiple gate-lengths. For example, thegate-length biasing methodology may provide one or more of: essentiallycontinuous gate-length sizing without increased mask layers, topologybased transistor level biasing, OPC error biasing, biasing withawareness of iso-dense effects, and other benefits. Each of thesebenefits can lead to further optimization than is available with amultiple gate-length process alone.

The following sections include further descriptions of exemplaryapproaches to small increases in gate-length (e.g., referred to simplyas L_(Gate) biasing), including the following. Cell-level and transistorlevel gate-length biasing methodologies, which may be based, forexample, on less than 10% increases in drawn L_(Gate) of devices and maybe used to address leakage reduction, are discussed. Experiments andresults showing benefits of cell-level and transistor-level L_(Gate)biasing methodologies in different design scenarios such as dual-V_(th)are also discussed. An analysis of potential benefits and caveats ofsuch biasing methodologies, including some possible implications forlithography and process variability, is presented. Lastly, variousimplementation methods for gate-length biasing are presented.

FIG. 3 is a flow chart of an exemplary embodiment of an L_(Gate) biasingmethodology 300 in accordance with the present invention. A cell is acircuit comprised of one or more transistors configured to perform somefunction, such as a NAND cell, an inverter, a buffer, or other circuit.Libraries are collections of such cells. System-level chip designers maychoose a variety of cells from a library to design a particular chip,such as a microprocessor or microcontroller. The current-voltagecharacteristics of the transistors in a cell are determined by thedevice's properties, such as gate width, gate-length, insulatorthickness, and doping concentrations, among other properties. Theseproperties are generally optimized for a particular technology node; forexample, a 130 nm node describes a technology based upon a nominalgate-length of 130 nm. Further perturbations, however, made to some ofthese properties, for example, gate-length biasing, can be used tofurther optimize performance for particular designs.

In the exemplary embodiment of FIG. 3, the method 300 begins withlibrary generation 305 in which a standard cell library is enhanced byadding L_(Gate) biased variants to the library. Next, designoptimization 310 of a circuit containing the standard cells isperformed. In an exemplary embodiment, design optimization 310 entailsleakage reduction, in which leakage optimization is performed toincorporate slower, low-leakage cells (i.e., L_(Gate) biased cells) intonon-critical paths, while retaining faster, high-leakage cells incritical paths. A significant benefit of method 300 is that it may beused in conjunction with other optimization techniques, such as themulti-threshold voltage technique, which is widely used for leakagereduction.

Cell-Level Gate-Length Biasing

As discussed above, gate-length biasing may be implemented at the celllevel. FIG. 4A is a flow chart of an exemplary cell-level Lgate biasing(CLLB) embodiment of the library generation 305 step of method 300. Alibrary may include hundreds of cells designed for a particulartechnology node. To enhance the library, in accordance with the CLLBapproach, cells are identified 405 for biasing. For example, all cellsin the library may be targeted for biasing, or some subset of cells,such as the most commonly used cells, may be identified.

As shown in FIG. 4A, library generation 305 also includes determining410 a bias length for the targeted cells. In one embodiment, a singlebias length is chosen. However, in alternative embodiments, multiplebias lengths may be chosen. The tradeoff is in the final size of thelibrary generated by adding biased cell variants. The CLLB approachgenerally relies on the V_(th) roll-off curve for a given technology.The roll-off curve affects the feasibility of the approach and alsoaffects the chosen bias length, i.e., how much to increase the nominalgate-length.

One embodiment of the CLLB library generation 305 focuses on less than10% biasing. However, alternative embodiments may include biasing over10%. Bias lengths less than 10% of the nominal gate-length areadvantageous for several reasons. First, the nominal gate-length of thetechnology is usually very close to or beyond the “knee” of the leakagevs. L_(Gate) curve which arises due to SCE. For large bias (i.e.,significant increases in L_(Gate)), the advantage of super-lineardependence of leakage on gate-length is lost. Moreover, dynamic powerand delay both increase almost linearly with gate-length. Therefore,small biases give more “bang for the buck.” Second, from amanufacturability point of view, having two prevalent pitches, which arerelatively distinct, in the design can harm printability properties(i.e., the size of the process window). Cells with biases of less thanabout 10% can often retain the same poly-pitch as the unbiased versionof the cell. There is a small decrease in spacing between gate-polygeometries, but minimum spacing rules typically are not violated evenwhen the unbiased polys are at minimum spacing, since the biases arewithin the tolerance margins. Since design rule check (DRC) tools firstsnap to grid, biases of under about 10% typically are consideredacceptable due to margins in design rules. Third, an increase in drawndimension that is less than the layout grid resolution (e.g., typically10 nm for 130 nm technology) ensures pin-compatibility with the nominalversion of the cell. This is important to ensure that multi-L_(Gate)optimizations can be done post-placement or even after detailed-routing,without ECOs. In this way, the layout transparency that has mademulti-V_(th) optimization so adoptable within chip implementation flowsis retained. Biases smaller than the layout grid-pitch typically willalso ensure design-rule correctness for the biased cell layout, providedthat the unbiased version is design-rule correct.

As shown in FIG. 4A, library generation 305 also entails designing 415the biased variants. In particular, the biased L_(Gate) library is laidout and characterized. Since small biases to the gate-length are usuallyselected 410, the layout of the biased library cell usually does notneed to change except for a simple automatic scaling of dimensions.Moreover, if the bias is smaller than the minimum layout grid pitch,design rule violations typically do not occur. After the slightmodifications to the layout, the biased versions of the cell are putthrough the standard extraction and power/timing characterizationprocess.

As an example, seven test cases were chosen to provide verification ofthe CLLB approach. For library generation 305, the test cases were firstsynthesized with the complete Artisan TSMC 130 nm library to identify405 the most frequently used cells. A restricted library was generatedcomposed of variants of the 25 most commonly used cells in the testcases. A biased variant, in which all devices had the biasedgate-length, was added for each cell.

The SPICE models for unbiased cells had a nominal gate-length of 130 nmfor all transistors. All transistors in a biased variant of a cell had agate-length of 138 nm. Choosing 410 138 nm as the biased gate-lengthplaces the delay of the low-V_(th)-biased variant between thelow-V_(th)-nominal gate-length variant and the nominal-V_(th)-nominalgate-length variant. Larger bias can lead to larger per-cell leakagesavings at a higher performance cost. However, in a resizing setup(described below) with a delay constraint, the leakage benefit over thewhole design can decrease as the number of instances that can bereplaced by their biased version is reduced. Larger or smaller biasesmay produce larger leakage reductions for some designs. Libraries,however, are usually not design specific and a biased gate-length thatproduces good leakage reductions for most designs is desirable. Theapproach for determining 410 the biased gate-length described above willgenerally work well for most typical designs. Those of skill in the artwill appreciate that the value of 138 nm is highly process specific andis not intended to reflect the best biased gate-length for all 130 nmprocesses. Alternative embodiments may use biasing at finer levels, ofgranularity, for example, having multiple biased gate-lengths and/orindependently biasing devices within a cell.

As discussed above, in an exemplary embodiment of method 300, designoptimization 310 entails leakage reduction. FIG. 4B is a flow chart ofan exemplary CLLB embodiment of the design optimization 310 step ofmethod 300. An exemplary embodiment of design optimization 310 includesidentifying 450 a design goal. In one embodiment, the design goal may beminimizing delay, which is often a primary design goal in circuitdesign. Alternative embodiments, however, may be designed to achieveother design goals, such as other types of power reduction, improvedmanufacturability or reliability or yield, or reducing timing delays orincreasing the operating frequency of a chip. In the case of delay as adesign goal, a circuit designer performs gate-width sizing to achievethe minimum possible delay. Such sizing may be performed, for example,prior to gate-length biasing.

In the example of FIG. 4B, design optimization 310 also includeschoosing 455 a biasing algorithm. Different algorithms will be apparent.For large optimizations, an iterative approach may be desirable. Forsmall cases, exhaustive search may be appropriate. In one embodiment,the biasing algorithm may be a downsizing algorithm for leakagereduction. In an alternative embodiment, an upsizing algorithm forleakage reduction may be used. In further alternative embodiments, acombination of downsizing and upsizing, or other algorithms may be used.A sensitivity-based, downsizing algorithm for leakage optimizationbegins with all nominal cells and replaces cells on non-critical pathswith biased variants. An upsizing algorithm begins with all biasedvariants in the circuit and replaces critical cells with theirnominal-L_(Gate) variants. In many cases, downsizing appears to be moreeffective at leakage reduction than upsizing irrespective of the delayconstraints. An intuitive rationale is that upsizing approaches havedual objectives of delay and leakage reduction during cell selection forupsizing. Downsizing approaches, on the other hand, only downsize cellsthat do not cause timing violations and have the sole objective ofleakage minimization. An upsizing approach, however, may be faster whenloose delay constraints are to be met since fewer transistors areupsized. Delay is almost always the primary design goal, however, andloose delay constraints are rare.

The phrase “downsizing a cell instance” (or node) implies replacing thecell or node by its biased variant in the circuit. In an exemplaryembodiment of a sensitivity-based downsizing algorithm, s_(p) representsthe timing slack on a given cell instance p, and s′_(p) represents theslack on p after it has been downsized. l_(p) and l′_(p) indicate theinitial and final leakages of cell instance p before and afterdownsizing respectively. P_(p) represents the sensitivity associatedwith cell instance p and is defined as:

$P_{p} = \frac{_{p} - _{p}^{\prime}}{s_{p -}s_{p}^{\prime}}$

As shown in FIG. 4B, design optimization 310 also includes selecting 460a timing analyzer. A timing analyzer is a useful component of adelay-aware power optimization approach. It is used to compute delaysensitivity to biasing of cell instances in the design. For an accurateyet scalable implementation, various embodiments of the designoptimization 310 may choose from, for example, three types of timersthat vary in speed and accuracy: standard static timing analysis (SSTA),exact incremental STA (EISTA), or constrained incremental STA (CISTA).

Under SSTA, slews and actual arrival times (AATs) are propagated forwardafter a topological ordering of the circuit. Required arrival times(RATs) are back-propagated and slacks are then computed. Under EISTA,timing analysis begins with the fan-in nodes of the node that has beenmodified. From all these nodes, slews and AATs are propagated in theforward direction until the values stop changing. RATs areback-propagated from only those nodes for which the slew, AAT or RAT haschanged. Under CISTA, sensitivity computation involves temporarymodifications to a cell to find change in its slack and leakage. To makethis step faster, the incremental timing calculation can be restrictedto only one stage before and one stage after the modified gate. The nextstage is affected by slew changes and the previous stage is affected bythe pin capacitance change of the modified gate. The ripple effect onother stages farther away from the gate, primarily due to slew changesbut potentially also due to coupling induced delay as the arrival timewindows can change, may be neglected since high accuracy is not criticalfor sensitivity computation.

As shown in FIG. 4B, design optimization 310 also includes optimizing465. In an exemplary embodiment of a CLLB approach, design optimization310 entails leakage reduction. Thus, an exemplary embodiment ofoptimizing 465 includes performance of leakage optimization.

FIG. 5 is sample pseudocode for an exemplary embodiment of a leakageoptimization implementation. The algorithm begins with SSTA andinitializes slack values s_(p) in Line 1. Sensitivities P_(p) arecomputed for all cell instances p and put into a set S in Lines 2-5. Thelargest sensitivity P_(p*) is selected and removed from the set S, andthe algorithm continues if P_(p*)≧0. In Line 11, the function SaveStatesaves the gate-lengths of all transistors in the circuit as well as thedelay, slew, and slack values. The cell instance p* is downsized andEISTA is run from it to update the delay, slew, and slack values inLines 12-13. The timing libraries capture the effect of biasing on slewas well as input capacitance, and the static timing analyzer efficientlyand accurately updates the design to reflect the changes in delay,capacitance, and slew due to the downsizing move. If there is no timingviolation (e.g., negative slack on any timing arc) then the move isaccepted, otherwise the saved state is restored. If the move isaccepted, sensitivities of node p*, its fan-in nodes, and its fan-outnodes are updated in Lines 17-21. The algorithm continues until thelargest sensitivity becomes negative or the size of S becomes zero.Function ComputeSensitivity(q) temporarily downsizes cell instance q andfinds its slack using CISTA. Since high accuracy is not critical forsensitivity computation CISTA, which is faster but less accurate thanEISTA, may be used for timing analysis.

As an example of the CLLB design optimization 310, minimum delay wasidentified 450 as the design goal. Gate-width sizing was performed priorto L_(Gate) biasing using Synopsys Design Compiler v2003.06-SP1. Asensitivity-based downsizing algorithm was chosen 455 as the biasingalgorithm. In terms of selecting 460 a timing analyzer, under SSTA, slewand slack values of the timer matched exactly with Synopsys PrimeTimevU-2003.03-SP2. Delay values from the timer also matched exactly withPrimeTime under the restricted use model. However, the timer did notsupport features such as interconnect delay, hold time checks, falsepaths, multiple clocks, 3-pin SDFs, etc. Additionally, the timer couldhandle both unate and non-unate cells. Under EISTA, slews, slacks, anddelays matched exactly with SSTA. Under CISTA, incremental timingcalculation was restricted to one stage before and one stage after themodified gate and the ripple effect was neglected. Each test case wasoptimized 465 for leakage reduction. Table 1 is a comparison of leakageand runtime (labeled as CPU) when EISTA, which is generally moreaccurate, and CISTA, which is generally faster, were used forsensitivity computation. Table 1 show the results from CISTA were almostthe same as from EISTA, with a significant savings in central processingunit (CPU) runtime.

TABLE 1 Leakage (mW) CPU (s) Circuit EISTA CISTA EISTA CISTA s92340.0712 0.0712 4.86 2.75 c5315 0.3317 0.3359 24.18 14.99 c7552 0.62840.6356 55.56 43.79 s13207 0.1230 0.1228 33.43 17.15 c6288 1.8730 1.9157508.86 305.09 alu128 0.4687 0.4857 1122.89 544.75 s38417 0.4584 0.44671331.49 746.79

Transistor-Level Gate-Length Biasing

The term “timing arc” indicates an intra-cell path from an inputtransition to a resulting rise (or fall) output transition. Generally,for an n-input gate there are 2n timing arcs; however, there may be fourtiming arcs corresponding to non-urate inputs (e.g., select input ofMUX). Due to different parasitics as well as PMOS/NMOS asymmetries,these timing arcs can have different delay values associated with them.For instance, Table 2 shows the delay values for the same input slew andload capacitance pair for different timing arcs of a NAND2X2 cell fromthe Artisan TSMC 130 nm library. The asymmetry in delays of varioustiming arcs within the NAND2X2 cell is clear. Pin swapping is a commonpost-synthesis timing optimization step to make use of the asymmetry indelays of different input pins. To make use of asymmetry rise-falldelays, techniques such as P/N ratio perturbations, for example, maydecrease circuit delay.

TABLE 2 Propagation Delay Transition Delay Timing Arc (ps) (ps) A → Y ↑99.05 104.31 A → Y ↓ 73.07 79.12 B → Y ↑ 107.20 112.98 B → Y ↓ 70.6576.37

The gate-length biasing methodology can also exploit the asymmetries indelay values using transistor-level gate-length biasing (TLLB). Sincedifferent transistors control different timing arcs of a cell, TLLB canindividually modify delays of different timing arcs. For example, TLLBcan yield leakage optimization by “recovering” leakage from cellinstances in which: (1) not all timing arcs are timing-critical, and/or(2) rise and fall transitions are not both timing-critical at the sametime.

As with CLLB described above, TLLB uses libraries of cells, which areused by system-level chip designers to design particular chips. Eachcell includes one or more transistors configured to perform somefunction, such as a NAND cell, an inverter, a buffer, or other circuit.The current-voltage characteristics of the transistors in a cell aredetermined by the device's properties, which are generally optimized fora particular technology node; for example, a 130 nm gate-lengthtechnology node. Further perturbations, however, made to some of theseproperties, for example, gate-length biasing, can be used to furtheroptimize performance for particular designs.

FIG. 6 is a flow chart of an exemplary TLLB embodiment of the librarygeneration 305 step of the method 300 of FIG. 3. Similarly to FIG. 4A,cells are identified 405 for biasing and bias lengths are determined410.

As shown in FIG. 6, library generation 305 also entails designing 715the biased variants. For each cell, the library may contain variantscorresponding to all subsets of the set of timing arcs. A gate with ninputs has 2n timing arcs and therefore 2^(2n) variants, including theoriginal cell. Given a set of critical timing arcs, the goal is toassign a biased L_(Gate) to some transistors in the cell and nominalL_(Gate) to the remaining transistors.

FIG. 7 is a flow chart of an exemplary embodiment of a biasing method750 to design 715 biased variants. Under biasing method 750, a designgoal is identified 755, for example, minimum delay. An optimization goalis also identified 760, for example, leakage reduction. Given the designgoal and the optimization goal, the task is to design biased variantssuch that, for example, (1) critical timing arcs have a delay penalty ofless than 1% with respect to the original unbiased cell, and (2) cellleakage power is minimized. In one embodiment, assignment of a biasedL_(Gate) to transistors in a cell, given a set of critical timing arcs,can be done manually 765 by analyzing 770 the cell topology for simplecells. In an alternative embodiment, however, the process can also beautomated 765. In an exemplary automatic process, all configurations foreach cell in which nominal L_(Gate) is assigned to some transistors andbiased L_(Gate) to the others are enumerated 775. For eachconfiguration, the delay and leakage are determined 780 under acanonical output load, for example, using SPICE simulations with aninverter (INVX1) as a load. For each possible subset of timing arcs thatcan be simultaneously critical, one biasing configuration is chosen 785based on the two criteria given earlier.

As an example, FIG. 8 is a schematic diagram of a simple NAND cell 800biased using the TLLB method. The biasing scheme shown in FIG. 8 showsL_(Gate) biasing of the transistors in the simplest NAND cell (NAND2X1)when only the rise and fall timing arcs from input A to the output Outare critical. In this case only the PMOS device 805 with B as its inputcan be slowed without penalizing the critical timing arcs.

Referring to FIG. 3, the TLLB method also entails design optimization310. As discussed above, in an exemplary embodiment of the TLLB method,design optimization 310 entails leakage reduction, in which leakageoptimization is performed. The exemplary embodiment of the designoptimization 310 method of FIG. 4B, discussed above with respect to theCLLB method, may also be applied for the TLLB method. For example, asensitivity-based downsizing approach that is similar to the onedescribed above with reference to FIGS. 4B and 5 and the CLLB method canbe used to optimize for leakage reduction. The method keeps track of theslack on every timing arc and computes sensitivity for each timing arc.

A particular benefit of the TLLB method is that it can be performed inconjunction with other optimization techniques, including the CLLBmethod discussed above. For example, in one embodiment, to limit theruntime and memory requirements, optimization may occur first at thecell level, using the CLLB method 300, and then at the transistor level,using the TLLB method 600. Further savings can be achieved, for example,by optimizing only the unbiased cells in the circuit. In anotherembodiment, the TLLB method may be implemented to further optimize aprocess flow that already includes a multi-V_(th) approach or even amulti-gate-length approach to provide optimization with a device-levelgranularity to optimize based on critical timing arcs.

EXPERIMENTAL EXAMPLES

A test flow for validation of the L_(Gate) biasing methodology wasimplemented in the context of leakage reduction. Seven test cases werechosen for investigation. Details of the test cases used in theexperiments are given in Table 3. For each test case, Table 3 shows thesource of the test case, the number of cells in the circuit, delay,leakage power, and dynamic power. Sequential test cases (e.g., thosebeginning with “s”) were handled by converting them to combinationalcircuits by treating all flip-flops as primary inputs and primaryoutputs. The test flow was designed to validate an L_(Gate) biasingmethodology in which CLLB was performed first followed by TLLB to showfurther reductions in leakage. Thus, while library generation and designoptimization are discussed primarily with respect to the CLLB method,the discussion applies as well to the TLLB method.

TABLE 3 Test Leakage Dynamic Case Source #Cells Delay (ns) (mW) (mW)s9234 ISCAS′89 861 0.437 0.7074 0.3907 c5315 ISCAS′85 1442 0.556 1.44131.5345 c7552 ISCAS′85 1902 0.485 1.8328 2.0813 s13207 ISCAS′89 19570.904 1.3934 0.6296 c6288 ISCAS′85 4289 2.118 3.5994 8.0316 alu128Opencores.org[2] 7536 2.306 5.1571 4.4177 s38417 ISCAS′89 7826 0.6924.9381 4.2069

In this example, to identify the cells to bias, the test cases weresynthesized with the Artisan TSMC 130 nm library using Synopsys DesignCompiler v2003. 06-SP1 with low-V_(th) cells only. To limit librarycharacterization runtime, the library was restricted to variants of thefollowing 25 most frequently used cells: CLICINVX1, INVX12, INVX1,INVX3, INVX4, INVX8, INVXL, MX12X1, MXI2X4, NAND2BX4, NAND2X1, NAND2X2,NAND2X4, NAND2X6, NAND2X8, NAND2XL, NOR2X1, NOR2X2, NOR2X4, NOR2X6,NOR2X8, OAI21X4, XNOR2X1, XNOR2X4, XOR2X4. To identify the mostfrequently used cells, the test cases were synthesized with the completelibrary and the 25 most frequently used cells were selected. The delayconstraint was kept tight so that the post-synthesis delay was close tothe minimum achievable delay. The enhanced library was generated and thecircuit designs optimized as described previously.

This example focused on up to two gate-lengths (nominal and biased) andtwo threshold voltages. Experiments were performed for the followingscenarios: (1) Single-V_(A), single-L_(Gate) (SVT-SGL), (2) Dual-VA,single-L_(Gate) (DVT-SGL), (3) Single-V_(th), dual-L_(Gate) (SVT-DGL),and (4) Dual-V_(th), dual-L_(Gate) (DVT-DGL). The dual-V_(th) flow usednominal and low values of V_(th) while the single-V_(th) flow used onlythe low value of V_(th). STMicroelectronics 130 nm device models wereused with two V, values each for PMOS transistors (−0.09V and −0.17V)and NMOS transistors (0.11V and 0.19V). Cadence SignalStorm v4.1 (withSynopsys HSPICE) was used for delay and power characterization of cellvariants. Synopsys Design Compiler was used to measure circuit delay,dynamic power, and leakage power. An activity factor of 0.02 was assumedfor dynamic power calculation in the experiments. No assumptions weremade for any wire-load models; as a result, the dynamic power and delayoverheads of L_(Gate) biasing are conservative (i.e., overestimated).All experiments were run on an Intel Xeon 1.4 GHz computer with 2 GB ofRAM.

Table 4 shows the leakage savings and delay penalties due to L_(Gate)biasing for all cells in the library, for both low V_(th) and nominalV_(th). In this experiment, small gate-length biasing reduced leakage by24% to 38% for the most commonly used cells, while incurring delaypenalties generally fewer than 10%. The results show that small biasesin L_(Gate) can afford significant leakage savings with smallperformance impact.

TABLE 4 Nominal V_(th) Low V_(th) Delay Leakage Delay Leakage PenaltyCell Reduction (%) Penalty (%) Reduction (%) (%) CLKINVX1 30.02 5.5934.12 5.54 INVX12 30.28 4.70 36.27 6.87 INVX1 29.45 5.08 33.63 5.12INVX3 30.72 5.68 35.67 5.52 INVX4 30.01 5.36 35.38 6.28 INVX8 29.97 6.7535.73 5.25 INVXL 24.16 4.91 28.05 4.79 MXI2X1 23.61 5.45 27.26 5.97MXI2X4 27.77 6.28 33.27 6.76 NAND2BX4 29.86 7.70 34.07 7.52 NAND2X133.19 5.32 37.03 5.58 NAND2X2 32.55 6.13 36.64 6.47 NAND2X4 32.21 6.5436.95 6.63 NAND2X6 31.76 11.37 37.09 6.75 NAND2X8 31.70 6.07 37.14 7.29NAND2XL 28.81 5.39 29.86 5.50 NOR2X1 27.42 5.47 32.58 5.39 NOR2X2 28.545.92 34.06 5.66 NOR2X4 28.85 6.61 34.25 8.21 NOR2X6 28.78 7.29 34.187.47 NOR2X8 28.76 6.51 34.40 6.96 OAI21X4 32.89 6.98 37.63 6.82 XNOR2X128.22 5.75 33.06 7.59 XNOR2X4 30.96 4.86 37.99 7.76 XOR2X4 30.87 7.9237.98 6.85

To assess the maximum impact of biasing, the power-performance envelopeobtained by replacing every device in the design by its device-levelbiased variant was explored. The leakage optimization approach was thenapplied to selectively bias cells on non-critical paths. Table 5 showsthe impact of gate-length biasing on power for single threshold-voltagedesigns. In particular, Table 5 shows leakage reduction, dynamic powerpenalty, and total power reduction for the test cases when L_(Gate)biasing was applied without dual-V_(th) assignment. The delay penaltyconstraint was set to 0%, 2.5%, and 5% for each of the test cases. Notethat the delay penalty for SVT-SGL was always set to 0% due to thenon-availability of V_(A) and L_(Gate) knobs. SVT-DGL was slower thanSVT-SGL for delay penalties of 2.5% and 5%.

TABLE 5 SVT-SGL SVT-DGL Reduction Delay Leakage Dynamic Total LeakageDynamic Total Leakage Dynamic Total CPU Test (ns) (mW) (mW) (mW) (mW)(mW) (mW) (%) (%) (%) (s) s9234 0.437 0.7074 0.3907 1.0981 0.5023 0.40050.9028 28.99 −2.50 17.79 1.81 0.447 0.7074 0.3907 1.0981 0.5003 0.40060.9008 29.28 −2.52 17.96 1.79 0.458 0.7074 0.3907 1.0981 0.4983 0.40060.8988 29.56 −2.51 18.15 1.79 c5315 0.556 1.4413 1.5345 2.9758 1.25521.5455 2.8007 12.91 −0.72 5.88 5.60 0.570 1.4413 1.5345 2.9758 1.04151.5585 2.6000 27.74 −1.56 12.63 5.80 0.584 1.4413 1.5345 2.9758 1.02421.5604 2.5846 28.94 −1.69 13.15 5.79 c7552 0.485 1.8328 2.0813 3.91411.4447 2.0992 3.5439 21.18 −0.86 9.46 10.97 0.497 1.8328 2.0813 3.91411.3665 2.1042 3.4707 25.44 −1.10 11.33 11.08 0.509 1.8328 2.0813 3.91411.3177 2.1084 3.4261 28.10 −1.30 12.47 10.89 s13207 0.904 1.3934 0.62962.0230 0.9845 0.6448 1.6293 29.35 −2.42 19.46 11.46 0.927 1.3934 0.62962.0230 0.9778 0.6449 1.6226 29.83 −2.42 19.79 11.31 0.949 1.3934 0.62962.0230 0.9758 0.6446 1.6204 29.97 −2.39 19.90 11.27 c6288 2.118 3.59948.0316 11.6310 3.3391 8.0454 11.3845 7.23 −0.17 2.12 70.51 2.171 3.59948.0316 11.6310 2.8461 8.0931 10.9392 20.93 −0.77 5.95 74.79 2.224 3.59948.0316 11.6310 2.7415 8.1051 10.8466 23.83 −0.92 6.74 70.11 alu128 2.3065.1571 4.4177 9.5748 4.5051 4.4429 8.9480 12.64 −0.57 6.55 270.00 2.3635.1571 4.4177 9.5748 3.5992 4.4818 8.0810 30.21 −1.45 15.60 212.97 2.4215.1571 4.4177 9.5748 3.5900 4.4826 8.0726 30.39 −1.47 15.69 211.47s38417 0.692 4.9381 4.2069 9.1450 3.4847 4.2765 7.7612 29.43 −1.65 15.13225.18 0.710 4.9381 4.2069 9.1450 3.4744 4.2778 7.7522 29.64 −1.69 15.23225.68 0.727 4.9381 4.2069 9.1450 3.4713 4.2779 7.7492 29.70 −1.69 15.26221.35

Table 6 shows the impact of gate-length biasing on power when L_(Gate)biasing was applied together with the dual-V_(th) approach (i.e., fordouble threshold-voltage designs). The delay penalty constraint was setto 0%, 2.5%, and 5% for each of the test cases. Tables 5 and 6 also showthe delay and CPU runtime consumed.

TABLE 6 DVT-SGL DVT-DGL Reduction Delay Leakage Dynamic Total LeakageDynamic Total Leakage Dynamic Total CPU Test (ns) (mW) (mW) (mW) (mW)(mW) (mW) (%) (%) (%) (s) s9234 0.437 0.0984 0.3697 0.4681 0.0722 0.38010.4523 26.60 −2.81 3.37 1.86 0.447 0.0914 0.3691 0.4604 0.0650 0.37980.4448 28.81 −2.90 3.39 1.89 0.458 0.0873 0.3676 0.4549 0.0609 0.37840.4393 30.20 −2.95 3.41 1.83 c5315 0.556 0.3772 1.4298 1.8070 0.33911.4483 1.7874 10.11 −1.29 1.09 5.74 0.570 0.2871 1.4193 1.7064 0.24851.4390 1.6875 13.45 −1.39 1.11 6.21 0.584 0.2401 1.4119 1.6520 0.19861.4328 1.6314 17.27 −1.48 1.24 6.14 c7552 0.485 0.6798 1.9332 2.61300.6655 1.9393 2.6048 2.10 −0.32 0.31 10.40 0.497 0.4698 1.9114 2.38120.4478 1.9210 2.3689 4.68 −0.50 0.52 10.51 0.509 0.3447 1.8994 2.24410.3184 1.9107 2.2291 7.63 −0.59 0.67 10.55 s13207 0.904 0.1735 0.59300.7664 0.1247 0.6069 0.7316 28.09 −2.35 4.54 11.59 0.927 0.1561 0.59200.7481 0.1066 0.6060 0.7127 31.68 −2.37 4.73 11.73 0.949 0.1536 0.59190.7455 0.1027 0.6060 0.7087 33.14 −2.39 4.93 11.76 c6288 2.118 1.97337.7472 9.7205 1.9517 7.7572 9.7089 1.09 −0.13 0.12 79.25 2.171 1.22587.5399 8.7657 1.1880 7.5574 8.7454 3.08 −0.23 0.23 79.25 2.224 0.84467.4160 8.2606 0.8204 7.4283 8.2487 2.87 −0.17 0.14 77.28 alu128 2.3060.6457 3.9890 4.6347 0.5184 4.0353 4.5537 19.73 −1.16 1.75 240.09 2.3630.6151 3.9837 4.5988 0.4970 4.0242 4.5212 19.21 −1.02 1.69 262.37 2.4210.5965 3.9817 4.5782 0.4497 4.0378 4.4875 24.62 −1.41 1.98 277.99 s384170.692 0.5862 3.8324 4.4186 0.4838 3.8680 4.3518 17.46 −0.93 1.51 238.620.710 0.5637 3.8309 4.3946 0.4189 3.8861 4.3050 25.69 −1.44 2.04 238.990.727 0.5504 3.8306 4.3810 0.4067 3.8849 4.2916 26.11 −1.42 2.04 234.94

As shown in Tables 5 and 6, in some examples (e.g., s9234, s13207,s38417), selective gate-length biasing at the circuit level reducedcircuit leakage by up to 30% with no delay penalty (i.e., delay penaltyconstraint set to 0%). The results of Tables 5 and 6 also indicate thatthe leakage reductions primarily depend on the slack profile of thecircuit. If many of the paths have near-zero slacks, then the leakagereductions are smaller. As the delay penalty increases, more slack isintroduced on paths and larger leakage reductions are seen. The resultsalso show leakage reductions were smaller when a circuit was previouslyoptimized using dual-V_(th) assignment. This is expected becausedual-V_(th) assignment consumes slack on non-critical paths reducing theslack available for L_(Gate) optimization. Larger leakage reductionswere also observed in sequential circuits. This is most likely becausecircuit delay is determined primarily by the slowest pipeline stage andthe percentage of non-critical paths is typically higher in sequentialcircuits. In particular, the two circuits for which less leakagereductions were seen (c6288, c7552) have very few non-critical paths anda very small percentage of cells could be biased. For these test cases,even V_(th) assignment does not achieve as much as it does on other testcases. For these test cases, leakage savings due to gate-length biasingare less for DVT than for SVT because fewer cells are left onnon-critical paths after V_(th) assignment. A greater fraction of cellsare expected to lie on non-critical paths for larger sequentialcircuits, making the gate-length biasing methodology especiallyattractive for such circuits.

The leakage models in these experiments did not include gate leakage,which can marginally increase due to gate-length biasing. Gate leakageis composed of gate-length independent and dependent components. Thegate-length independent component includes edge direct tunneling(I_(gs)+I_(gd)), while the gate-length dependent component includesgate-to-channel (I_(gc)) and gate-to-body (I_(gb)) tunneling. Thegate-length independent component, which stems from the gate-drain andgate-source overlap regions, is not affected by gate-length biasing.

To assess the change in gate-length dependent components due to biasing,SPICE simulations were performed to report the gate-to-channel leakagefor nominal and biased devices. Since the gate-to-body component isgenerally two orders of magnitude smaller than the gate-to-channelcomponent, it was therefore excluded from the analysis. The analysisused 90 nm BSIM4 device models from a leading foundry that model allfive components of gate leakage described in BSIM v4.4.0.

Table 7 shows the impact of gate-length biasing on subthreshold leakageand gate tunneling leakage for biased and unbiased, nominal V_(th), 90nm NMOS and PMOS devices of 1 μm width at 25° C. and 125° C. Thereductions in subthreshold and gate leakage as well as the total leakagereduction are shown. As shown in Table 7, although the subthresholdleakage itself increases significantly with temperature, the percentagereduction in it due to gate-length biasing does not change much. Theresults of Table 7 indicate total leakage reductions were high even whengate leakage was considered. Based on these results, the increase ingate leakage due to gate-length biasing appears negligible for thesecases. Furthermore, since gate-length biasing is a runtime leakagereduction approach, the operating temperature is likely to be higherthan room temperature. At typical operating temperatures, gate leakageis not a major portion of total leakage, since it could be more thanfive times less than subthreshold leakage. Thus, when the operatingtemperature is elevated, the reduction in total leakage is approximatelyequal to the reduction in subthreshold leakage and total leakagereductions similar to the results presented in Tables 5 and 6 areexpected.

TABLE 7 Subthreshold Leakage (nW) Gate Tunneling Leakage (nW) TotalLeakage (nW) Device Temp (° C.) Unbiased Biased Reduction UnbiasedBiased Reduction Unbiased Biased Reduction PMOS 25 6.45 4.21 34.73% 2.012.03 −1.00% 8.46 6.24 26.24% NMOS 25 12.68 8.43 33.52% 6.24 6.25 −0.16%18.92 14.68 22.41% PMOS 125 116.80 79.91 31.58% 2.17 2.20 −1.38% 118.9782.11 30.98% NMOS 125 115.90 83.58 27.89% 6.62 6.69 −1.05% 122.52 90.2726.32%

Gate leakage is predicted to increase with technology scaling.Technologies under 65 nm, however, are likely to adopt high-k gatedielectrics which could significantly reduce gate leakage. If this trendcontinues, in terms of scalability, subthreshold leakage will likelyremain the dominant problem at high operating temperatures. Thus, thegate-length biasing method disclosed is likely to be of increasingbenefit at smaller technology nodes. Even if gate leakage were toapproach subthreshold leakage, which would be a suboptimal deviceengineering solution point, gate-length biasing results in exponentialsavings in subthreshold current for a linear penalty in gate leakage,which, while not optimal, may still be preferable. One remote issue iswhen the minimum gate-length is set at the peak of the “hump” often seenin V_(th) vs. L curves due to the reverse short channel effect andcaused by halo implants. If the minimum gate-length is set at the peakof the hump gate leakage may actually worsen with increasinggate-length. Typically, this is not the case, however, since such aminimum gate-length is usually not the best design point. For example,with a typical commercial 90 nm low-V_(th) device, the 80 nm drawngate-length can be biased by over 10 nm before reaching the start of the“hump.”

In addition, because vertical electric fields do not increase due togate-length biasing, another possible benefit of the gate-length biasingmethodology is that negative-bias thermal instability (NBTI) is notexpected to increase with gate-length biasing. Should NBTI correlatewith gate-length, possibly due to weak process dependent variations inNBTI due to channel length, L_(Gate) biasing of PMOS transistors may beconstrained, since NBTI primarily affects PMOS devices while NMOSdevices are more strongly affected by subthreshold leakage.

Manufacturability and process variability are important considerationsof the L_(Gate) biasing approach. As the gate-length biasing methodrelies primarily on biasing of drawn gate-length, it is important tocorrelate this with actual printed gate-length on the wafer. This isimportant as the bias introduced in gate-length is of the same order asthe typical critical dimension (CD) tolerances in manufacturingprocesses. Moreover, experimental observations are consistent withexpecting larger gate-lengths to have better printability propertiesleading to less CD—and hence leakage—variability. To validate themultiple gate-length approach in a post-manufacturing setup, a reticleenhancement technology (RET) and process simulation flow for an examplecell master are followed.

In this experiment, model-based optical proximity correction (OPC) isperformed on the layout of a generic AND2X6 cell using Calibrev9.3_(—)2.5, using annular optical illumination with λ=248 nm andNA=0.7. The printed image of the cell is then calculated using densesimulation in Calibre. FIG. 9 is an image of a cell layout 900 of thegeneric AND2X6 cell with simulated printed gate-lengths 905 for alldevices in the cell. Gate-length L_(Gate) is measured for every devicein the cell, for both biased and unbiased versions. Table 8 shows acomparison of the printed gate-lengths for biased and unbiased versionsof the seven NMOS and PMOS devices labeled in FIG. 9. The unbiased idealgate-length is 130 nm while the biased ideal is 138 nm. As expected,biased and unbiased gate-lengths are highly correlated and track eachother well. There are some outliers that may be due to the relativesimplicity of the OPC model used. High correlation between printeddimensions of biased and unbiased versions of the cells implies that thebenefits of gate-length biasing estimated using drawn dimensions willnot be lost after RET application and the manufacturing process.

TABLE 8 Gate Length (nm) Device PMOS NMOS Number Unbiased Biased Diff.Unbiased Biased Diff. 1 128 135 +7 129 135 +6 2 127 131 +4 126 131 +5 3127 131 +4 127 131 +4 4 124 131 +7 126 133 +7 5 124 131 +7 124 132 +8 6124 132 +8 124 132 +8 7 127 135 +8 127 135 +8

Another potentially valuable benefit of slightly larger gate-lengths isthe possibility of improved printability. Minimum poly spacing is largerthan poly gate-length, so that the process window, which is constrainedby the minimum resolvable dimension, tends to be larger as gate-lengthincreases even though poly spacing decreases. Table 9 show the processwindow improvement with gate-length biasing. In particular, the depthsof focus for various values of exposure latitude (ELAT), with the sameillumination system as above, for 130 nm and 138 nm lines are shown. Thedata in Table 9 was obtained using process simulation performed withProlith v8.1.2, using a CD tolerance of 13 nm.

TABLE 9 Defocus (μm) ELAT (%) for 130 nm ELAT (%) for 138 nm −0.2 4.935.30 0.0 6.75 7.26 0.2 5.69 6.24

A number of sources of variation can cause fluctuations in gate-length,and hence in performance and leakage. Up to 20× variation in leakage hasbeen reported in production microprocessors. For leakage, the reductionin variation post-gate-length biasing is likely to be substantial as thelarger gate-length is closer to the “flatter” region of the V_(th) vs.L_(Gate) curve. To validate this intuition, the impact of gate-lengthvariation on leakage and performance, both pre- and post-biasing, wasstudied using a simple worst-case approach. The CD variation budget wasassumed to be ±10 nm. The performance and leakage of the test casecircuits were measured at the worst-case (WC), nominal (NOM), andbest-case (BC) process corners, which focus on gate-length variation.This was done for the DVT-DGL approach in which biasing was done alongwith dual-V_(th) assignment.

Table 10 shows the reduction in performance (e.g., circuit delay) andleakage power uncertainty with biased gate-length in presence ofinter-die variations. The uncertainty spread is specified as apercentage of nominal. The results are given for dual-V_(th), with agate-length biasing of 8 nm, and show significant reduction in leakagevariability. For the seven test cases, up to a 41% reduction in leakagepower uncertainty caused by linewidth variation was observed. Ingeneral, such large reductions in uncertainty may lead to substantialimprovements in manufacturing yield and product cost, potentiallyoutweighing benefits of alternative leakage control techniques. Notethat the corner case analysis only models the inter-die component ofvariation, which typically constitutes roughly half of the total CDvariation.

TABLE 10 Unbiased (DVT-SGL) Biased (DVT-DGL) % Spread Circuit BC WC NOMBC WC NOM Reduction Circuit Delay (ns) s9234 0.504 0.385 0.436 0.5060.387 0.436 −0.53 c5315 0.642 0.499 0.556 0.643 0.501 0.556 0.71 c75520.559 0.433 0.485 0.559 0.433 0.485 0.46 s13207 1.029 0.797 0.904 1.0310.800 0.904 0.35 c6288 2.411 1.888 2.118 2.411 1.889 2.118 0.13 alu1282.631 2.045 2.305 2.640 2.053 2.306 −0.10 s38417 0.793 0.615 0.692 0.7930.616 0.692 0.03 Leakage (mW) s9234 0.0591 0.1898 0.0984 0.0467 0.12680.0722 38.76 c5315 0.2358 0.6883 0.3772 0.2176 0.5960 0.3391 16.38 c75520.4291 1.2171 0.6798 0.4226 1.1825 0.6655 3.57 s13207 0.1036 0.34010.1735 0.0807 0.2211 0.1247 40.65 c6288 1.2477 3.5081 1.9733 1.23733.4559 1.9517 1.85 alu128 0.3827 1.2858 0.6457 0.3229 0.9641 0.518429.00 s38417 0.3526 1.1453 0.5862 0.3038 0.8966 0.4838 25.22

To assess the impact of both within-die (WID) and die-to-die (DTD)components of variation, 10,000 Monte-Carlo simulations withσ_(WID)=σ_(DTD)=3:33 nm were run. The variations were assumed to followa Gaussian distribution with no correlations. The results for threedual-V_(th) scenarios were compared: unbiased (DVT-SGL), biased(DVT-DGL), and uniformly biased (when gate-lengths of all transistors inthe design were biased by 8 nm). FIG. 10 is a graph of the leakagedistributions for the unbiased, technology-level selectively biased, anduniformly biased scenarios for a representative test case. As shown inFIG. 10, the distributions exhibit a “left-shift” with the introductionof biased devices in the design. Also, for uniform biasing, all devicesare biased and the circuit delay no longer meets timing.

Table 11 presents the leakage power reductions from TLLB over CLLB. Thetest cases show up to a 10% reduction in leakage power for TLLB overCLLB. Since TLLB primarily biases devices of unbiased cells, it performswell over CLLB particularly when CLLB does not perform well (i.e., whenCLLB leaves many cells unbiased). The leakage savings from TLLB,however, come usually at the cost of increased library size. Asdescribed above, the library for TLLB can be composed of all 2^(2n)variants of each n-input cell. For the 25 cells in this test case, thelibrary for TLLB was composed of a total of 920 variants. From the smallleakage savings at the cost of significantly increased library size,TLLB is primarily more advantageously performed for single- anddouble-input cells that are frequently used.

TABLE 11 Leakage CPU (s) Delay CLLB TLLB Reduction CLLB TLLB Circuit(ns) (mW) (mW) (%) (s) (s) s9234 0.437 0.0722 0.0712 1.41 1.86 2.750.447 0.0650 0.0628 3.39 1.89 2.38 0.458 0.0609 0.0596 2.28 1.83 2.31c5315 0.556 0.3391 0.3359 0.95 5.74 14.99 0.570 0.2485 0.2368 4.71 6.2115.29 0.584 0.1986 0.1918 3.42 6.14 13.44 c7552 0.485 0.6655 0.6356 4.4910.40 43.79 0.497 0.4478 0.4438 0.89 10.51 43.22 0.509 0.3184 0.29936.02 10.55 38.90 s13207 0.904 0.1247 0.1228 1.58 11.59 17.15 0.9270.1066 0.1055 1.08 11.73 15.62 0.949 0.1027 0.1021 0.61 11.76 14.28c6288 2.118 1.9517 1.9157 1.84 79.25 305.09 2.171 1.1880 1.1555 2.7479.46 289.56 2.224 0.8203 0.8203 0.00 77.28 291.44 alu128 2.306 0.51840.4857 6.31 240.09 544.75 2.363 0.4970 0.4492 9.62 262.37 609.13 2.4210.4497 0.4184 6.95 277.99 534.68 s38417 0.692 0.4838 0.4467 7.67 238.62746.79 0.710 0.4189 0.3982 4.93 238.99 507.62 0.727 0.4067 0.3765 7.42234.94 525.06

Implementations of Gate-Length Biasing Methodology

The general gate-length biasing methodology of the present invention canbe applied to a circuit design in many different ways. For example, themask maker or integrated circuit (IC) fab can implement gate-lengthbiasing via optical proximity correction (OPC). Alternately, theprovider of the cell library can offer an enhanced library containinggate-length biased variants of standard cells. As another example,electronic design automation (EDA) tool vendors may implement some orall of gate-length biasing as part of their software design tools (e.g.,as part of a design rule checker).

An OPC tool based implementation of the gate-length biasing methodologyallows biasing to occur after a layout has been designed. Although thelayout is changed after the circuit is designed, the circuit designerpreferably uses the optimizations provided by gate-length biasing upfront, for example, by using models based on the gate-length biaseddesigns rather than on the nominal designs. OPC implementation of thegate-length biasing methodology allows optimization beyond thatachievable by designers in traditional design flows through directinfluence of the OPC process, which designers currently cannot do. Forexample, a biased gate-length of 93 nm, where the nominal gate-length is90 nm, will reduce leakage. Unfortunately, the traditional combinationof OPC and the process cannot guarantee CD control better than a bestcase/worst case gate-lengths of, for example, 88/98 nm (the“guardband”). An OPC implementation of the gate-length biasingmethodology, aware of an optimization goal such as leakage reduction,will guide the OPC process such that it is extremely unlikely for theprinted gate-length to be smaller than the 93 nm goal, if there issufficient timing slack. One benefit of OPC implementation of thegate-length biasing methodology is that optimization is implementedwithout perturbing a foundry's qualified OPC recipe.

FIG. 11 is a flowchart of an exemplary embodiment of an OPCimplementation 1100 of the gate-length biasing methodology of thepresent invention. A nominal layout 1105 for a circuit and an annotatedlayout or bias requirements 1110 for the layout are provided to a module1115 that makes changes to the OPC process to implement gate-lengthbiasing. The nominal layout 1105 describes the circuit before biasing,and information describing the bias is contained in the annotated layoutor bias requirements 1110. The module 1115 may implement gate-lengthbiasing in many different ways, as will be further described below.Results from the gate-length biasing module 1115 are provided to an OPCengine 1120, such as Calibre or Proteus, which yields an OPC solution1125 for the gate-length biased layout.

The driver of the OPC engine 1120 of FIG. 11 preprocesses the runscriptand the setup files of the OPC tool to enforce design-specificdirectives in the application of OPC. These directives are usuallylocalized, e.g., on a per-cell or per-device basis. Access to an OPCimplementation, such as implementations 1100, offers post-siliconbenefits beyond those achievable by optimizations performed during thedesign flow (e.g., dual gate-length). The expected post-silicon benefitfrom using an OPC implementation depends on the design, the effort spenton OPC, and the quality of the OPC tool. Following are six embodiments,in order of expected increasing flow implementation effort, that an OPCimplementation of the gate-length biasing methodology may providewithout significant loss of timing or yield.

First, an exemplary embodiment of an OPC implementation of thegate-length biasing methodology provides a target CD tolerance “knob.”In this embodiment, the module 1115 can control the target CD tolerancethat the OPC engine aims for, in a device- or feature-specific manner.Conventional OPC flows set a uniform, unsigned tolerance over the entiredesign. By contrast, this embodiment of the OPC gate-length biasingimplementation sets signed, device-specific tolerances. For example, thechannel length of a setup-critical gate may only be allowed to decreasefrom nominal. Channel lengths of other gates with positive setup slackmay be allowed only to increase from nominal, while maintainingtiming-correctness, to reduce leakage.

For example, in one exemplary approach, the magnitude of the toleranceis changed such that every feature receives the loosest possibletolerance, while respecting foundry-qualified limits and timingcorrectness. For each feature, this effectively brings the expectederror closer to the worst-case error. For example, if a particular gatecan increase its channel length by 5 nm without violating timing, thereis a leakage power reduction benefit from setting its tolerance closerto 5 nm rather than as tight as possible (e.g., 1 nm) since the loosertolerance effectively shifts the average gate-length to longer lengths.Looser tolerances have the side effect of reducing OPC runtime as wellas mask cost.

Second, in another embodiment, an OPC implementation of the gate-lengthbiasing methodology provides an OPC error “knob.” In this embodiment,the OPC implementation can control the direction of OPC error. Inparticular, the OPC implementation can drive OPC for a given gate suchthat the gate almost always prints with larger channel length thannominal, but still within the tolerance bounds. For example, if thetolerance on a gate-length is set to +/−5 nm, the OPC implementationwill drive OPC such that the gate-length is almost always close to +5 nmrather than −5 nm, relative to nominal. The target CD tolerance and OPCerror knobs together give an OPC implementation of the gate biasingmethodology essentially a continuous range of gate-length variants,applicable on a device-specific basis, without requiring the full designprocess of cell layout, design rule checking, characterization ofperformance libraries, etc. For example, implementation of thegate-length biasing methodology at the OPC level avoids violation ofacross chip linewidth variation (ACLV) tolerances at the design level,which may maximize the optimization possible using OPC.

Third, in another embodiment, an OPC implementation of the gate-lengthbiasing methodology provides an explicit biasing “knob.” In thisembodiment, the OPC implementation performs explicit biasing of layoutCDs. Bias, error magnitude, and error direction are co-optimized toachieve a much finer degree of control and hence favorable optimization,for example, a larger reduction in leakage.

Fourth, in another embodiment, an OPC implementation of the gate-lengthbiasing methodology provides a sub-resolution assist feature (SRAF)insertion “knob.” With cooperation of the production OPC group, in thisembodiment, the OPC implementation allows set up of alternative SRAFinsertion recipes such that the implementation can use them to optimizeyield. More precisely, the SRAF insertion can be optimized such that thedesign remains timing-correct and power is reduced through processvariation, specifically, through focus variation. This optimization isgenerally applied in a device-specific manner.

Fifth, in another embodiment, an OPC implementation of the gate-lengthbiasing methodology provides guardband reduction from knowledge of CDtolerance split. In this embodiment, the OPC implementation canoptionally take, if available, the CD tolerance split, for example, fromanalysis of variance (ANOVA), as an input. This enables the OPCimplementation to find out how much of the total technology-specific CDtolerance is attributable to OPC errors. As a result, the OPCimplementation can reduce the guardband in its biasing optimizationbecause it drives OPC along with biasing. This gives an OPCimplementation more leeway in optimization while still being corner-casetiming correct.

Sixth, in another embodiment, an OPC implementation of the gate-lengthbiasing methodology uses out-of-focus process models. In thisembodiment, an OPC implementation is aware of iso-dense layout patterneffects arising primarily from focus variation in lithography. Givencertain abstractions of out-of-focus process models, if available, theOPC implementation uses its focus- or depth-of-focus (DOF)-aware timingand power analyses to further optimize yield. In particular, because theOPC implementation is layout and process aware, gate-lengths may beselectively biased taking iso-dense effects into account.

Alternatively, the gate-length biasing methodology may be implemented bygenerating an enhanced cell library available to designers, such that adesigner can choose from among nominal cells and their biased variants.FIG. 12 is a flowchart of an exemplary embodiment of a cell libraryimplementation 1200 of the gate-length biasing methodology of thepresent invention. The layout generator 1215 produces a biased version1220 of a standard cell 1202. A gate-length bias 1205 is determined andprovided to the layout generator 1215, which also receives a set ofdesign rules 1210 for a particular technology. The layout generator1215, for example, Prolific or Cadabra, generates the biased cell(s)1220. Additionally, manual editing of one or more layouts may alsooccur. The resulting enhanced library may include standard (i.e.,nominal) cell layouts in addition to standard cell layouts to whichL_(Gate) biasing has been applied (i.e., biased cells). Commerciallyavailable layout generators may be augmented with the functionalitydescribed previously (e.g., see FIG. 5) in order to automaticallygenerate biased variants for a particular cell.

The gate-length biasing methodology may have an impact on layout designrules depending on the implementation methodology chosen. For example,cell libraries may have to plan for gate-length biasing by increasingcontact to poly spacing, depending on the use model. Making thepost-layout to RET flow transparent to the designer may be accomplished,for example, by giving “hints” to the OPC implementation rather thanexplicit biases or as explicit changes in critical dimensions that arepre-qualified as layout-transparent. These options would generally occurafter physical verification, and biases that are not pre-qualified as“safe” by foundry and library teams would generally not be implemented.If, on the other hand, gate-length biasing is done at the cell layoutstage, then contact-to-poly spacing may need to be increased to be DRCcorrect. A mix of the two approaches (i.e., post- and pre-final layout)could potentially achieve even greater improvements because it ispossible to bias OPC errors.

Alternatively, the gate-length biasing methodology may be implemented atthe EDA tool level, for example, as part of a design rule checking tool.FIG. 13 is a flowchart of an exemplary embodiment of an EDA toolimplementation 1300 of the gate-length biasing methodology of thepresent invention. An annotated layout or gate-length bias 1305 to beimplemented for a subset of devices is provided to an EDA tool 1315,such as Calibre, Hercules, Diva, or Assurer. EDA tool 1315 also receivesa set of design rules 1310 and generates a biased layout 1320 of thedesign, for example using the methodologies described previously.

As shown in FIG. 13, an annotated layout or gate-length bias 1305 isprovided as part of EDA implementation 1300. Similarly, as shown in FIG.11, an annotated layout or gate-length bias requirements 1110 are alsoprovided as part of OPC implementations 1100. These bias requirementsmust be communicated to the OPC or EDA tools. FIG. 14 is a flowchart ofan exemplary embodiment of a bias requirement communication methodology1400, for example, for the OPC or EDA implementations 1100 and 1300, ofFIGS. 11 and 13. An optimizer 1425 receives a variety of inputs,including, for example, a set of characterized models 1405, a set ofdesign constraints 1410, a design layout 1415, and a design netlist1420. The characterized models 1405 may include, for example, a timinglibrary. The design constraints 1410 may include, for example, timing,power, yield, and other constraints. The optimizer 1425 uses the inputsto generate bias requirements 1430 for devices in the layout. Some ofthe devices may include a nominal gate-length, while others may includea biased gate-length. In this example, the bias requirementcommunication methodology 1400 creates an annotation layer 1435 ofshapes for every distinct bias solution. For example, the annotationlayer may include bias of 2 nm overlaps for all devices or cellsrequiring a 2 nm bias. The result is an annotated layout 1440, whichyields the bias implementation 1445 to provide to the OPC and EDA tools.

In alternate embodiments, the gate-length biasing methodology isimplemented in computer hardware, firmware, software, and/orcombinations thereof. Apparatus of the invention can be implemented in acomputer program product tangibly embodied in a machine-readable storagedevice for execution by a programmable processor; and method steps ofthe invention can be performed by a programmable processor executing aprogram of instructions to perform functions of the invention byoperating on input data and generating output. The invention can beimplemented advantageously in one or more computer programs that areexecutable on a programmable system including at least one programmableprocessor coupled to receive data and instructions from, and to transmitdata and instructions to, a data storage system, at least one inputdevice, and at least one output device. Each computer program can beimplemented in a high-level procedural or object-oriented programminglanguage, or in assembly or machine language if desired; and in anycase, the language can be a compiled or interpreted language. Suitableprocessors include, by way of example, both general and special purposemicroprocessors. Generally, a processor will receive instructions anddata from a read-only memory and/or a random access memory. Generally, acomputer will include'one or more mass storage devices for storing datafiles; such devices include magnetic disks, such as internal hard disksand removable disks; magneto-optical disks; and optical disks. Storagedevices suitable for tangibly embodying computer program instructionsand data include all forms of non-volatile memory, including by way ofexample semiconductor memory devices, such as EPROM, EEPROM, and flashmemory devices; magnetic disks such as internal hard disks and removabledisks; magneto-optical disks; and CD-ROM disks. Any of the foregoing canbe supplemented by, or incorporated in, ASICs (application-specificintegrated circuits) and other forms of hardware.

Although the detailed description contains many specifics, these shouldnot be construed as limiting the scope of the invention but merely asillustrating different examples and aspects of the invention. It shouldbe appreciated that the scope of the invention includes otherembodiments not discussed in detail above. For example, while thedescriptions above were given primarily in the context of increasinggate-lengths in order to reduce leakage power, neither increasinggate-length nor reducing leakage power is a requirement. For example,gate-length biasing can also be used to address other types of powerconsumption, manufacturability concerns and timing characteristics. Inone application, gate-lengths on important timing paths may be reducedin order to reduce timing delays and/or allow an increase in operatingfrequency (e.g., clock frequency) for the chip.

As another example, positive and negative gate-length biasing can becombined to improve the clock frequency of a chip while still conserving(leakage) power. For example, the devices on the critical timing pathcan receive negative gate-length biases, thus achieving a speedup at thecost of increased leakage power. At the same time, other devices of thecircuit can be slowed down (i.e., positive gate-length biases) to takeadvantage of the increased timing slack, resulting in an overallreduction in leakage power that more than compensates for the additionalleakage power from the negatively-biased devices.

Various other modifications, changes and variations which will beapparent to those skilled in the art may be made in the arrangement,operation and details of the method and apparatus of the presentinvention disclosed herein without departing from the spirit and scopeof the invention as defined in the appended claims. Therefore, the scopeof the invention should be determined by the appended claims and theirlegal equivalents. Furthermore, no element, component, or method step isintended to be dedicated to the public regardless of whether theelement, component, or method step is explicitly recited in the claims.

1. A standard cell library containing cells wherein at least onetransistor in at least one cell is annotated for gate length biasing.